The goal of this paper is to study the dynamics of holomorphic diffeomorphisms in such that the resonances among the first 1≤r≤n eigenvalues of the differential are generated over by a finite number of-linearly independent multi-indices (and more resonances are allowed for other eigenvalues). We give sharp conditions for the existence of basins of attraction where a Fatou coordinate can be defined. Furthermore, we obtain a generalization of the Leau-Fatou flower theorem, providing a complete description of the dynamics in a full neighborhood of the origin for 1-resonant parabolically attracting holomorphic germs in Poincaré-Dulac normal form.
Dynamics of multi-resonant biholomorphisms / BRACCI, FILIPPO; Raissy, J; Zaitsev, D.. - In: INTERNATIONAL MATHEMATICS RESEARCH NOTICES. - ISSN 1073-7928. - (2013), pp. 4772-4797. [DOI: 10.1093/imrn/rns192]
Dynamics of multi-resonant biholomorphisms
BRACCI, FILIPPO;
2013
Abstract
The goal of this paper is to study the dynamics of holomorphic diffeomorphisms in such that the resonances among the first 1≤r≤n eigenvalues of the differential are generated over by a finite number of-linearly independent multi-indices (and more resonances are allowed for other eigenvalues). We give sharp conditions for the existence of basins of attraction where a Fatou coordinate can be defined. Furthermore, we obtain a generalization of the Leau-Fatou flower theorem, providing a complete description of the dynamics in a full neighborhood of the origin for 1-resonant parabolically attracting holomorphic germs in Poincaré-Dulac normal form.
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